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Cheng and P.-C

4 Pith papers cite this work. Polarity classification is still indexing.

4 Pith papers citing it
abstract

In this work, we prove a one-shot random coding bound for classical-quantum channel coding, a problem conjectured by Burnashev and Holevo in 1998. By choosing the optimal input distribution, the bound implies the optimal error exponent (i.e., the reliability function) of classical-quantum channels for rates above the critical rate, even in infinite-dimensional Hilbert spaces. Our result extends to various quantum packing-type problems, including classical communication over any fully quantum channel with or without entanglement-assistance, constant composition codes, and classical data compression with quantum side information via fixed-length or variable-length coding. Our technical ingredient is to establish an operator layer cake theorem - the directional derivative of an operator logarithm admits an integral representation of certain projections. This shows that a kind of pretty-good measurement is equivalent to a randomized Holevo-Helstrom measurement, which provides an operational explanation of why the pretty-good measurement is pretty good.

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quant-ph 4

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2026 4

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representative citing papers

Optimal Trace Inequalities for Single-Shot Quantum Information

quant-ph · 2026-04-16 · unverdicted · novelty 8.0 · 2 refs

Optimal trace inequalities are derived for single-shot quantum information, replacing prior constants with a smaller Lambert-W prefactor for logarithmic traces and providing optimal two-sided collision-divergence bounds.

Sufficiency and Petz recovery for positive maps

quant-ph · 2026-04-09 · accept · novelty 7.0 · 2 refs

Minimal sufficient Jordan algebras characterize sufficiency for positive trace-preserving maps on quantum states, with Neyman-Pearson tests generating them and equality in data-processing inequalities implying Petz recovery.

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Showing 4 of 4 citing papers.

  • Optimal Trace Inequalities for Single-Shot Quantum Information quant-ph · 2026-04-16 · unverdicted · none · ref 14 · 2 links · internal anchor

    Optimal trace inequalities are derived for single-shot quantum information, replacing prior constants with a smaller Lambert-W prefactor for logarithmic traces and providing optimal two-sided collision-divergence bounds.

  • Quantum Noncommutativity Uniquely Determines Relative Entropy quant-ph · 2026-07-02 · unverdicted · none · ref 46 · internal anchor

    Quantum noncommutativity uniquely selects the Umegaki relative entropy as the only additive measure compatible with single-shot optimal discrimination in binary guessing games.

  • Multiple Quantum Hypothesis Testing: One-Shot Pairwise Bounds and Sharp Asymptotics quant-ph · 2026-06-04 · unverdicted · none · ref 35 · internal anchor

    Establishes dimension-free one-shot pairwise bounds for multiple quantum hypothesis testing, resolves Audenaert-Mosonyi conjecture, and proves achievability of multiple quantum Chernoff distance for arbitrary separable Hilbert spaces.

  • Sufficiency and Petz recovery for positive maps quant-ph · 2026-04-09 · accept · none · ref 44 · 2 links · internal anchor

    Minimal sufficient Jordan algebras characterize sufficiency for positive trace-preserving maps on quantum states, with Neyman-Pearson tests generating them and equality in data-processing inequalities implying Petz recovery.